How can you describe a rational number as a quotient when the divisor is not zero?
How can you describe a rational number as a quotient when the divisor is not zero?
*A rational number is a fraction that includes all integers except for when zero is the divisor.
Which of the following is a rational number?
*7.8
How do you write 14 programming errors for every 56 programmers as a rational number?
*1/4
The number line has the following numbers: 13, - 1.5, - 1.1, 1.03. Put the numbers in the correct order, A-D.
*-1.5, -1.1, 1.03, 1 3/4
The following numbers are shown on the number line: - 1.8, 0.8, 3.1, - 1.2, 2%. Which number is represented by point B?
*-1.2
is this correct?
To describe a rational number as a quotient when the divisor is not zero, we can use the concept of division. A rational number can be expressed as the ratio of two integers or the quotient of two numbers. The numerator represents the dividend, and the denominator represents the divisor.
Here's a step-by-step breakdown:
1. Start with a rational number, which can be represented as a fraction or decimal.
2. Identify the numerator, which is the number on the top of the fraction or to the left of the decimal point.
3. Identify the denominator, which is the number on the bottom of the fraction or to the right of the decimal point.
4. Divide the numerator by the denominator to obtain the quotient.
For example, let's consider the rational number 3/4:
1. The numerator is 3, and the denominator is 4.
2. Divide the numerator (3) by the denominator (4).
3. The quotient is 0.75.
Therefore, the rational number 3/4 can be described as the quotient of 3 divided by 4, which equals 0.75.
To describe a rational number as a quotient when the divisor is not zero, you need to understand the concept of a rational number and how it relates to division.
A rational number is a number that can be expressed as the quotient or fraction of two integers, where the denominator is not zero. In other words, it is a number that can be written in the form of "a/b" where "a" and "b" are integers and "b" is not equal to zero.
To obtain the quotient or fraction representation of a rational number, you can follow these steps:
1. Identify the numerator (the top part) and the denominator (the bottom part) of the rational number.
2. Write the numerator as an integer.
3. Write the denominator as an integer, making sure it is not zero.
4. Combine the numerator and denominator using a forward slash (/) to represent division, so the rational number can be expressed as "numerator / denominator."
For example, let's say we have the rational number 3/5. Here's how we can describe it as a quotient:
Step 1: The numerator is 3.
Step 2: The denominator is 5.
Step 3: Since the denominator is not zero, we can proceed.
Step 4: Combining the numerator and denominator, we get 3/5.
Therefore, the rational number 3/5 can be described as the quotient of 3 divided by 5.